PGTRB Mathematics New Updated Syllabus 2025

PGTRB Mathematics Syllabus 2025 – Complete Breakdown

Shiksha Class – Admission Going On
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Unit I: Algebra

• Groups: Cyclic Groups, Permutation Groups, Lagrange’s theorem, Normal subgroups, Homomorphism, Cayley’s theorem, Cauchy’s theorem, Sylow’s theorems, Finite Abelian Groups
• Rings: Integral Domain, Field, Ring Homomorphism, Ideals and Quotient Rings, Field of Quotients, Euclidean Rings, Polynomial Rings, Unique Factorization Domain
• Fields: Extension fields, Galois theory, Finite fields
• Vector Spaces: Bases, Dual spaces, Inner product spaces, Linear transformations, Rank, Characteristic roots, Canonical forms, Jordan form, Quadratic forms, Hermitian, Unitary, Normal transformations

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Unit II: Real Analysis

• Set theory, Countable and uncountable sets, Real number system, Archimedean Property
• Sequences and Series: Convergence, Supremum/Infimum, Limit theorems, Continuity, Uniform Continuity, Differentiability, Mean Value Theorem
• Series of functions: Uniform convergence, Continuity, Integration, Differentiation
• Riemann–Stieltjes integral: Definition, Properties, Integration of vector functions
• Power Series and Fourier Series
• Functions of several variables: Directional & Partial derivatives, Inverse & Implicit function theorems

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Unit III: Topology

• Topological spaces: Basis, Order, Product, Subspace Topologies
• Closed sets, Limit points, Continuous functions, Box and Product Topologies
• Connectedness, Compactness, Local Compactness
• Countability and Separation Axioms
• Normal spaces: Urysohn Lemma, Urysohn Metrization Theorem, Tietze Extension Theorem

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Unit IV: Complex Analysis

• Analytic Functions: Limits, Continuity, Power Series, Conformality, Mapping, Linear transformations
• Complex Integration: Line integrals, Cauchy’s Theorem and Integral Formula, Index of a point, Taylor’s theorem, Zeros and Poles, Maximum Modulus Principle

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Unit V: Functional Analysis

• Banach Spaces: Definitions, Inequalities, Linear transformations, Hahn-Banach Theorem, Open Mapping, Closed Graph Theorem
• Hilbert Spaces: Orthonormal bases, Adjoint of operators, Spectral Theorem
• Matrices and Operators: Determinants, Spectral radius, Regular and Singular elements, Banach Algebra

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Unit VI: Differential Geometry

• Curves and Surfaces: Frenet formulas, Curvature, Helices, Surfaces of revolution
• Geometric Concepts: Gaussian curvature, Fundamental forms, Isometry, Geodesics, Indicatrix, Dupin’s Theorem

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Unit VII: Differential Equations

Ordinary Differential Equations:

• Linear equations (constant & variable coefficients), Wronskian, Non-homogeneous equations, Initial value problems
• Special equations: Legendre, Bessel, Hermite
• Existence and Uniqueness, Exact equations, Lipschitz condition

Partial Differential Equations:

• Lagrange and Charpit Methods
• Classification and Solution of Second Order PDEs
• Separation of Variables: Laplace, Heat, Wave equations (2D)

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Unit VIII: Classical Mechanics and Numerical Analysis

Classical Mechanics:

• Generalized Coordinates, Lagrange’s Equations, Hamilton’s Equations, Canonical transformations, Poisson brackets

Numerical Analysis:

• Numerical solutions of equations: Iteration, Newton-Raphson
• Linear equations: Gauss Elimination, Gauss-Seidel
• Interpolation: Lagrange, Hermite, Spline
• Numerical differentiation & integration
• ODE Solvers: Picard, Euler, Modified Euler, Runge-Kutta

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Unit IX: Operations Research

• Linear Programming: Simplex, Duality, Revised Simplex
• Integer & Dynamic Programming, Non-linear Programming
• Network Analysis: Max Flow-Min Cut
• Queuing Theory: M/M/1, M/M/C, M/G/1 models
• Inventory Models: Deterministic, Single Price Break

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Unit X: Probability Theory

• Probability Basics: Sample space, Bayes’ Theorem, Random Variables, Distribution Functions
• Expectations, Moments, Characteristic Functions, Inequalities (Chebyshev, Markov)
• Convergence, Law of Large Numbers, Central Limit Theorem (i.i.d)
• Distributions: Binomial, Poisson, Normal, Exponential, Gamma, Beta, Cauchy
• Sampling Distributions: t, F, Chi-square, ANOVA, Large Sample Tests

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Shiksha Class – PGTRB Mathematics Coaching 2025
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